Third fundamental form

In differential geometry, the third fundamental form is a surface metric denoted by $\mathbf{III}$ . Unlike the second fundamental form, it is independent of the surface normal.

Definition

Let $S$ be the shape operator and $M$ be a smooth surface. Also, let $\mathbf{u}_p$ and $\mathbf{v}_p$ be elements of the tangent space $T_pM$ . The third fundamental form is then given by

\mathbf{III}(\mathbf{u}_p,\mathbf{v}_p)=S(\mathbf{u}_p)\cdot S(\mathbf{v}_p)\,.

Properties

The third fundamental form is expressible entirely in terms of the first fundamental form and second fundamental form. If we let $H$ be the mean curvature of the surface and $K$ be the Gaussian curvature of the surface, we have

\mathbf{III}-2H\mathbf{II}+K\mathbf{I}=0\,.

Various notions of curvature defined in differential geometry

Differential geometry of curves	Curvature Torsion of a curve Frenet–Serret formulas Radius of curvature (applications) Affine curvature Total curvature Total absolute curvature

Differential geometry of surfaces	Principal curvatures Gaussian curvature Mean curvature Darboux frame Gauss–Codazzi equations First fundamental form Second fundamental form Third fundamental form

Riemannian geometry	Curvature of Riemannian manifolds Riemann curvature tensor Ricci curvature Scalar curvature Sectional curvature

Curvature of connections	Curvature form Torsion tensor Cocurvature Holonomy

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Third fundamental form

Definition

Properties

See also